Question
The sun of 11 and 3/4 of a number is grace will receive $50 plus $5 per child for babysitting this afternoon. She is hoping to make at least $63 to buy a new video game tonight. How many children does she need to babysit write an inequality that could be used to solve this problem.
(Write numbers as fractions rather than decimals. Do not solve the inequality)
(Write numbers as fractions rather than decimals. Do not solve the inequality)
Answers
GPT-4o mini
Let the number of children Grace babysits be represented by \( x \).
Grace will earn $50 plus $5 per child, which can be expressed as:
\[
50 + 5x
\]
We want to find out how many children she needs to babysit to make at least $63. In terms of an inequality, this can be written as:
\[
50 + 5x \geq 63
\]
Now, we need to address the first part of your request regarding the "sun of 11 and 3/4 of a number." Assuming that the number refers to the same number of children (\( x \)), we can express "11 and 3/4 of a number" as:
\[
\frac{47}{4}x
\]
However, since it seems there is a misunderstanding regarding the first part, we will focus on the babysitting income and just provide the inequality related to her earnings.
Thus, the inequality to solve the problem regarding her babysitting earnings is:
\[
50 + 5x \geq 63
\]
This captures the essence of the problem. If you need further clarification or continuation, let me know!
Grace will earn $50 plus $5 per child, which can be expressed as:
\[
50 + 5x
\]
We want to find out how many children she needs to babysit to make at least $63. In terms of an inequality, this can be written as:
\[
50 + 5x \geq 63
\]
Now, we need to address the first part of your request regarding the "sun of 11 and 3/4 of a number." Assuming that the number refers to the same number of children (\( x \)), we can express "11 and 3/4 of a number" as:
\[
\frac{47}{4}x
\]
However, since it seems there is a misunderstanding regarding the first part, we will focus on the babysitting income and just provide the inequality related to her earnings.
Thus, the inequality to solve the problem regarding her babysitting earnings is:
\[
50 + 5x \geq 63
\]
This captures the essence of the problem. If you need further clarification or continuation, let me know!